Question

2- Evaluate the following integral: 0.4 | Vcos(2x)dx a) By calculator, b) Composite trapezoidal rule (with segment no. n=4) and determine the true relative error, c) Composite Simpson's 1/3 with n =4 and determine the true relative error, d) Simpson's 3/8 rule determine the true relative error, e) Composite Simpson's rule, with n =5, determine the true relative error.

Answer 1

classmate Date Page 10.4 こ Given: Lo J cos (22) dec a) By calculatoz ✓ Cos (2x) abe s [cos(zajt = 0.44 Fos(2x) (o sinagor f costas (51922) 3.12 3/4 E-0-98f0 b) composite Jeapezoidal Rule (n=4) J'rlag.de - 4 [** *4.3** (**) ( I a 0 ✓cos (2x) da ✓ cosax | 2e=0 Y a=0.1 x2 = 0.2 4, 56.99999 Y2 = 0.99998 Yot &z=0.3 X=0.4 43 -0.99997 | 94 = 0.99995 h = 0.4-0 -0.l 4

classmate Date page T- 02 [1 +0.99999 + 0.1 f0-99999+0.99998]+ 0.99998+0-99997 + Ord 2 = lxlos 17]+ O2 To.gg99740:99995 - 0.3gggg .: Relative escue = 0.4-0.39999 c) Composite Simpson' 1/3 ns4. I = f flauta = h [lotbout 4 C4, +Yzt - tema) + 2 (Y2+Mgt town] of ++ o. gggg5 +46699999 +0-99997) + 2 (0.99998) to -0.399991 Relative error =0.4-0.3999g| 3 9x106 d) Simpson 318 sule = 3h yo t 4m +3 (Y, +4₂ 444) + 2 (43 +4 ]] I=fr (a) dax= 4 - 3x0:! [1+ 0.99995 +3 (0.99999+ 0.99958) +20 gggg7 30.37499 Relative erive = 0.4-0.37499 = 0. = 0.02501

classmate Date poon e) Composite Simpson's rule n=5 Wosza X, = 0.08 x2 = 0.16 [23= 0.24 Yo = 1 Y = 0.999998 1 Y2 = 0.999992 Y =0.999982 Y 24 = 032 Ye = 0.999968 X5 20.4 Y5 -0.999951 0.08 3 1/ [to them +4 (1,443) + 2 (Y24/4) *+0.999951 +4(0-99999870-999982) +2[0-999992 +0.999968)] I = 0 37332716 .. Relative error a) By calculator 20.02667224 0:4 Inf Scorza de 0.4-0.37332776 o = 0.4